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I have many samples (y_i, (a_i, b_i, c_i)) where y is presumed to vary as a polynomial in a,b,c up to a certain degree. For example for a given set of data and degree 2 I might produce the model

y = a^2 + 2ab - 3cb + c^2 +.5ac

This can be done using least squares and is a slight extension of numpy's polyfit routine. Is there a standard implementation somewhere in the Python ecosystem?

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I've posted code here to solve this problem – MRocklin Jul 4 '12 at 23:55

2 Answers 2

polyfit does work, but there are better least square minimizers out there. I would recommend kmpfit, available at

It is more robust that polyfit, and there is an example on their page which shows how to do a simple linear fit that should provide the basics of doing a 2nd order polynomial fit.

def model(p, v, x, w):       
   a,b,c,d,e,f,g,h,i,j,k = p      #coefficients to the polynomials      
   return  a*v**2 + b*x**2 + c*w**2 + d*v*x + e*v*w + f*x*w + g*v + h*x + i*y + k  

def residuals(p, data):        # Function needed by fit routine
   v, x, w, z = data            # The values for v, x, w and the measured hypersurface z
   a,b,c,d,e,f,g,h,i,j,k = p   #coefficients to the polynomials  
   return (z-model(p,v,x,w))   # Returns an array of residuals. 
                               #This should (z-model(p,v,x,w))/err if 
                               # there are error bars on the measured z values

#initial guess at parameters. Avoid using 0.0 as initial guess
par0 = [1.0, 1.0,1.0,1.0,1.0,1.0,1.0,1.0,1.0,1.0,1.0] 

#create a fitting object. data should be in the form 
#that the functions above are looking for, i.e. a Nx4 
#list of lists/tuples like (v,x,w,z) 
fitobj = kmpfit.Fitter(residuals=residuals, data=data)

# call the fitter

The success of these things is closely dependent on the starting values for the fit, so chose carefully if possible. With so many free parameters it could be a challenge to get a solution.

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Can you post an example of multivariate regression using polyfit? I'm not convinced that this is supported. After looking through the documentation for kmpfit I fear this might be true of this library as well. – MRocklin Jun 11 '12 at 22:33
What are you trying to fit, y(x) = ax**2 + bx + c? Anyway, you can certainly do multivariable fitting with mpfit/kmpfit. – reptilicus Jun 12 '12 at 13:47
No, y(v, x, w) = av2 + bx2 + cw**2 + dvx + evw + fxw + gv + hx + iy + k – MRocklin Jun 12 '12 at 14:39
So this library would work but it solves the problem through an iterative method. Least squares polynomial fitting can be done in one step by solving a linear system. I've posted code in another answer that does this using numpy. – MRocklin Jul 6 '12 at 14:22

sklearn provides a simple way to do this.

Building off an example posted here:

#X is the independent variable (bivariate in this case)
X = array([[0.44, 0.68], [0.99, 0.23]])

#vector is the dependent data
vector = [109.85, 155.72]

#predict is an independent variable for which we'd like to predict the value
predict= [0.49, 0.18]

#generate a model of polynomial features
poly = PolynomialFeatures(degree=2)

#transform the x data for proper fitting (for single variable type it returns,[1,x,x**2])
X_ = poly.fit_transform(X)

#transform the prediction to fit the model type
predict_ = poly.fit_transform(predict)

#here we can remove polynomial orders we don't want
#for instance I'm removing the `x` component
X_ = delete(X_,(1),axis=1)
predict_ = delete(predict_,(1),axis=1)

#generate the regression object
clf = linear_model.LinearRegression()
#preform the actual regression, vector)

print("X_ = ",X_)
print("predict_ = ",predict_)
print("Prediction = ",clf.predict(predict_))

And heres the output:

>>> X_ =  [[ 0.44    0.68    0.1936  0.2992  0.4624]
>>>  [ 0.99    0.23    0.9801  0.2277  0.0529]]
>>> predict_ =  [[ 0.49    0.18    0.2401  0.0882  0.0324]]
>>> Prediction =  [ 126.84247142]
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